The principle of simultaneous saturation: Application to the k-linear restriction/extension problem

Abstract

This paper develops a new framework, simultaneous saturation, designed to quantify the size of sets whose elements are simultaneously large. The framework establishes a correspondence between the magnitude of such sets and a system of interdependent conditions linking their points. We first prove a general theorem establishing the correspondence and then apply the framework to multilinear restriction-type estimates. From this perspective, we obtain a new proof (independent of Bennett-Carbery-Tao BCT) of the d-linear restriction/extension theorem, and establish the λε loss conjectured bounds for the k-linear L2 Lp/k extension problem under mixed transversality/curvature conditions (k<d).